English

On long words avoiding Zimin patterns

Discrete Mathematics 2019-02-15 v1 Formal Languages and Automata Theory

Abstract

A pattern is encountered in a word if some infix of the word is the image of the pattern under some non-erasing morphism. A pattern pp is unavoidable if, over every finite alphabet, every sufficiently long word encounters pp. A theorem by Zimin and independently by Bean, Ehrenfeucht and McNulty states that a pattern over nn distinct variables is unavoidable if, and only if, pp itself is encountered in the nn-th Zimin pattern. Given an alphabet size kk, we study the minimal length f(n,k)f(n,k) such that every word of length f(n,k)f(n,k) encounters the nn-th Zimin pattern. It is known that ff is upper-bounded by a tower of exponentials. Our main result states that f(n,k)f(n,k) is lower-bounded by a tower of n3n-3 exponentials, even for k=2k=2. To the best of our knowledge, this improves upon a previously best-known doubly-exponential lower bound. As a further result, we prove a doubly-exponential upper bound for encountering Zimin patterns in the abelian sense.

Keywords

Cite

@article{arxiv.1902.05540,
  title  = {On long words avoiding Zimin patterns},
  author = {Arnaud Carayol and Stefan Göller},
  journal= {arXiv preprint arXiv:1902.05540},
  year   = {2019}
}
R2 v1 2026-06-23T07:41:23.653Z